// Random number extensions -*- C++ -*-

// Copyright (C) 2012-2016 Free Software Foundation, Inc.
//
// This file is part of the GNU ISO C++ Library.  This library is free
// software; you can redistribute it and/or modify it under the
// terms of the GNU General Public License as published by the
// Free Software Foundation; either version 3, or (at your option)
// any later version.

// This library is distributed in the hope that it will be useful,
// but WITHOUT ANY WARRANTY; without even the implied warranty of
// MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
// GNU General Public License for more details.

// Under Section 7 of GPL version 3, you are granted additional
// permissions described in the GCC Runtime Library Exception, version
// 3.1, as published by the Free Software Foundation.

// You should have received a copy of the GNU General Public License and
// a copy of the GCC Runtime Library Exception along with this program;
// see the files COPYING3 and COPYING.RUNTIME respectively.  If not, see
// <http://www.gnu.org/licenses/>.

/** @file ext/random
 *  This file is a GNU extension to the Standard C++ Library.
 */

#ifndef _EXT_RANDOM
#define _EXT_RANDOM 1

#pragma GCC system_header

#if __cplusplus < 201103L
# include <bits/c++0x_warning.h>
#else

#include <random>
#include <algorithm>
#include <array>
#include <ext/cmath>
#ifdef __SSE2__
# include <emmintrin.h>
#endif

#if defined(_GLIBCXX_USE_C99_STDINT_TR1) && defined(UINT32_C)

namespace __gnu_cxx _GLIBCXX_VISIBILITY(default)
{
_GLIBCXX_BEGIN_NAMESPACE_VERSION

#if __BYTE_ORDER__ == __ORDER_LITTLE_ENDIAN__

  /* Mersenne twister implementation optimized for vector operations.
   *
   * Reference: http://www.math.sci.hiroshima-u.ac.jp/~m-mat/MT/SFMT/
   */
  template<typename _UIntType, size_t __m,
	   size_t __pos1, size_t __sl1, size_t __sl2,
	   size_t __sr1, size_t __sr2,
	   uint32_t __msk1, uint32_t __msk2,
	   uint32_t __msk3, uint32_t __msk4,
	   uint32_t __parity1, uint32_t __parity2,
	   uint32_t __parity3, uint32_t __parity4>
    class simd_fast_mersenne_twister_engine
    {
      static_assert(std::is_unsigned<_UIntType>::value, "template argument "
		    "substituting _UIntType not an unsigned integral type");
      static_assert(__sr1 < 32, "first right shift too large");
      static_assert(__sr2 < 16, "second right shift too large");
      static_assert(__sl1 < 32, "first left shift too large");
      static_assert(__sl2 < 16, "second left shift too large");

    public:
      typedef _UIntType result_type;

    private:
      static constexpr size_t m_w = sizeof(result_type) * 8;
      static constexpr size_t _M_nstate = __m / 128 + 1;
      static constexpr size_t _M_nstate32 = _M_nstate * 4;

      static_assert(std::is_unsigned<_UIntType>::value, "template argument "
		    "substituting _UIntType not an unsigned integral type");
      static_assert(__pos1 < _M_nstate, "POS1 not smaller than state size");
      static_assert(16 % sizeof(_UIntType) == 0,
		    "UIntType size must divide 16");

    public:
      static constexpr size_t state_size = _M_nstate * (16
							/ sizeof(result_type));
      static constexpr result_type default_seed = 5489u;

      // constructors and member function
      explicit
      simd_fast_mersenne_twister_engine(result_type __sd = default_seed)
      { seed(__sd); }

      template<typename _Sseq, typename = typename
	std::enable_if<!std::is_same<_Sseq,
				     simd_fast_mersenne_twister_engine>::value>
	       ::type>
	explicit
	simd_fast_mersenne_twister_engine(_Sseq& __q)
	{ seed(__q); }

      void
      seed(result_type __sd = default_seed);

      template<typename _Sseq>
	typename std::enable_if<std::is_class<_Sseq>::value>::type
	seed(_Sseq& __q);

      static constexpr result_type
      min()
      { return 0; };

      static constexpr result_type
      max()
      { return std::numeric_limits<result_type>::max(); }

      void
      discard(unsigned long long __z);

      result_type
      operator()()
      {
	if (__builtin_expect(_M_pos >= state_size, 0))
	  _M_gen_rand();

	return _M_stateT[_M_pos++];
      }

      template<typename _UIntType_2, size_t __m_2,
	       size_t __pos1_2, size_t __sl1_2, size_t __sl2_2,
	       size_t __sr1_2, size_t __sr2_2,
	       uint32_t __msk1_2, uint32_t __msk2_2,
	       uint32_t __msk3_2, uint32_t __msk4_2,
	       uint32_t __parity1_2, uint32_t __parity2_2,
	       uint32_t __parity3_2, uint32_t __parity4_2>
	friend bool
	operator==(const simd_fast_mersenne_twister_engine<_UIntType_2,
		   __m_2, __pos1_2, __sl1_2, __sl2_2, __sr1_2, __sr2_2,
		   __msk1_2, __msk2_2, __msk3_2, __msk4_2,
		   __parity1_2, __parity2_2, __parity3_2, __parity4_2>& __lhs,
		   const simd_fast_mersenne_twister_engine<_UIntType_2,
		   __m_2, __pos1_2, __sl1_2, __sl2_2, __sr1_2, __sr2_2,
		   __msk1_2, __msk2_2, __msk3_2, __msk4_2,
		   __parity1_2, __parity2_2, __parity3_2, __parity4_2>& __rhs);

      template<typename _UIntType_2, size_t __m_2,
	       size_t __pos1_2, size_t __sl1_2, size_t __sl2_2,
	       size_t __sr1_2, size_t __sr2_2,
	       uint32_t __msk1_2, uint32_t __msk2_2,
	       uint32_t __msk3_2, uint32_t __msk4_2,
	       uint32_t __parity1_2, uint32_t __parity2_2,
	       uint32_t __parity3_2, uint32_t __parity4_2,
	       typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>& __os,
		   const __gnu_cxx::simd_fast_mersenne_twister_engine
		   <_UIntType_2,
		   __m_2, __pos1_2, __sl1_2, __sl2_2, __sr1_2, __sr2_2,
		   __msk1_2, __msk2_2, __msk3_2, __msk4_2,
		   __parity1_2, __parity2_2, __parity3_2, __parity4_2>& __x);

      template<typename _UIntType_2, size_t __m_2,
	       size_t __pos1_2, size_t __sl1_2, size_t __sl2_2,
	       size_t __sr1_2, size_t __sr2_2,
	       uint32_t __msk1_2, uint32_t __msk2_2,
	       uint32_t __msk3_2, uint32_t __msk4_2,
	       uint32_t __parity1_2, uint32_t __parity2_2,
	       uint32_t __parity3_2, uint32_t __parity4_2,
	       typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>& __is,
		   __gnu_cxx::simd_fast_mersenne_twister_engine<_UIntType_2,
		   __m_2, __pos1_2, __sl1_2, __sl2_2, __sr1_2, __sr2_2,
		   __msk1_2, __msk2_2, __msk3_2, __msk4_2,
		   __parity1_2, __parity2_2, __parity3_2, __parity4_2>& __x);

    private:
      union
      {
#ifdef __SSE2__
	__m128i _M_state[_M_nstate];
#endif
	uint32_t _M_state32[_M_nstate32];
	result_type _M_stateT[state_size];
      } __attribute__ ((__aligned__ (16)));
      size_t _M_pos;

      void _M_gen_rand(void);
      void _M_period_certification();
  };


  template<typename _UIntType, size_t __m,
	   size_t __pos1, size_t __sl1, size_t __sl2,
	   size_t __sr1, size_t __sr2,
	   uint32_t __msk1, uint32_t __msk2,
	   uint32_t __msk3, uint32_t __msk4,
	   uint32_t __parity1, uint32_t __parity2,
	   uint32_t __parity3, uint32_t __parity4>
    inline bool
    operator!=(const __gnu_cxx::simd_fast_mersenne_twister_engine<_UIntType,
	       __m, __pos1, __sl1, __sl2, __sr1, __sr2, __msk1, __msk2, __msk3,
	       __msk4, __parity1, __parity2, __parity3, __parity4>& __lhs,
	       const __gnu_cxx::simd_fast_mersenne_twister_engine<_UIntType,
	       __m, __pos1, __sl1, __sl2, __sr1, __sr2, __msk1, __msk2, __msk3,
	       __msk4, __parity1, __parity2, __parity3, __parity4>& __rhs)
    { return !(__lhs == __rhs); }


  /* Definitions for the SIMD-oriented Fast Mersenne Twister as defined
   * in the C implementation by Daito and Matsumoto, as both a 32-bit
   * and 64-bit version.
   */
  typedef simd_fast_mersenne_twister_engine<uint32_t, 607, 2,
					    15, 3, 13, 3,
					    0xfdff37ffU, 0xef7f3f7dU,
					    0xff777b7dU, 0x7ff7fb2fU,
					    0x00000001U, 0x00000000U,
					    0x00000000U, 0x5986f054U>
    sfmt607;

  typedef simd_fast_mersenne_twister_engine<uint64_t, 607, 2,
					    15, 3, 13, 3,
					    0xfdff37ffU, 0xef7f3f7dU,
					    0xff777b7dU, 0x7ff7fb2fU,
					    0x00000001U, 0x00000000U,
					    0x00000000U, 0x5986f054U>
    sfmt607_64;


  typedef simd_fast_mersenne_twister_engine<uint32_t, 1279, 7,
					    14, 3, 5, 1,
					    0xf7fefffdU, 0x7fefcfffU,
					    0xaff3ef3fU, 0xb5ffff7fU,
					    0x00000001U, 0x00000000U,
					    0x00000000U, 0x20000000U>
    sfmt1279;

  typedef simd_fast_mersenne_twister_engine<uint64_t, 1279, 7,
					    14, 3, 5, 1,
					    0xf7fefffdU, 0x7fefcfffU,
					    0xaff3ef3fU, 0xb5ffff7fU,
					    0x00000001U, 0x00000000U,
					    0x00000000U, 0x20000000U>
    sfmt1279_64;


  typedef simd_fast_mersenne_twister_engine<uint32_t, 2281, 12,
					    19, 1, 5, 1,
					    0xbff7ffbfU, 0xfdfffffeU,
					    0xf7ffef7fU, 0xf2f7cbbfU,
					    0x00000001U, 0x00000000U,
					    0x00000000U, 0x41dfa600U>
    sfmt2281;

  typedef simd_fast_mersenne_twister_engine<uint64_t, 2281, 12,
					    19, 1, 5, 1,
					    0xbff7ffbfU, 0xfdfffffeU,
					    0xf7ffef7fU, 0xf2f7cbbfU,
					    0x00000001U, 0x00000000U,
					    0x00000000U, 0x41dfa600U>
    sfmt2281_64;


  typedef simd_fast_mersenne_twister_engine<uint32_t, 4253, 17,
					    20, 1, 7, 1,
					    0x9f7bffffU, 0x9fffff5fU,
					    0x3efffffbU, 0xfffff7bbU,
					    0xa8000001U, 0xaf5390a3U,
					    0xb740b3f8U, 0x6c11486dU>
    sfmt4253;

  typedef simd_fast_mersenne_twister_engine<uint64_t, 4253, 17,
					    20, 1, 7, 1,
					    0x9f7bffffU, 0x9fffff5fU,
					    0x3efffffbU, 0xfffff7bbU,
					    0xa8000001U, 0xaf5390a3U,
					    0xb740b3f8U, 0x6c11486dU>
    sfmt4253_64;


  typedef simd_fast_mersenne_twister_engine<uint32_t, 11213, 68,
					    14, 3, 7, 3,
					    0xeffff7fbU, 0xffffffefU,
					    0xdfdfbfffU, 0x7fffdbfdU,
					    0x00000001U, 0x00000000U,
					    0xe8148000U, 0xd0c7afa3U>
    sfmt11213;

  typedef simd_fast_mersenne_twister_engine<uint64_t, 11213, 68,
					    14, 3, 7, 3,
					    0xeffff7fbU, 0xffffffefU,
					    0xdfdfbfffU, 0x7fffdbfdU,
					    0x00000001U, 0x00000000U,
					    0xe8148000U, 0xd0c7afa3U>
    sfmt11213_64;


  typedef simd_fast_mersenne_twister_engine<uint32_t, 19937, 122,
					    18, 1, 11, 1,
					    0xdfffffefU, 0xddfecb7fU,
					    0xbffaffffU, 0xbffffff6U,
					    0x00000001U, 0x00000000U,
					    0x00000000U, 0x13c9e684U>
    sfmt19937;

  typedef simd_fast_mersenne_twister_engine<uint64_t, 19937, 122,
					    18, 1, 11, 1,
					    0xdfffffefU, 0xddfecb7fU,
					    0xbffaffffU, 0xbffffff6U,
					    0x00000001U, 0x00000000U,
					    0x00000000U, 0x13c9e684U>
    sfmt19937_64;


  typedef simd_fast_mersenne_twister_engine<uint32_t, 44497, 330,
					    5, 3, 9, 3,
					    0xeffffffbU, 0xdfbebfffU,
					    0xbfbf7befU, 0x9ffd7bffU,
					    0x00000001U, 0x00000000U,
					    0xa3ac4000U, 0xecc1327aU>
    sfmt44497;

  typedef simd_fast_mersenne_twister_engine<uint64_t, 44497, 330,
					    5, 3, 9, 3,
					    0xeffffffbU, 0xdfbebfffU,
					    0xbfbf7befU, 0x9ffd7bffU,
					    0x00000001U, 0x00000000U,
					    0xa3ac4000U, 0xecc1327aU>
    sfmt44497_64;


  typedef simd_fast_mersenne_twister_engine<uint32_t, 86243, 366,
					    6, 7, 19, 1,
					    0xfdbffbffU, 0xbff7ff3fU,
					    0xfd77efffU, 0xbf9ff3ffU,
					    0x00000001U, 0x00000000U,
					    0x00000000U, 0xe9528d85U>
    sfmt86243;

  typedef simd_fast_mersenne_twister_engine<uint64_t, 86243, 366,
					    6, 7, 19, 1,
					    0xfdbffbffU, 0xbff7ff3fU,
					    0xfd77efffU, 0xbf9ff3ffU,
					    0x00000001U, 0x00000000U,
					    0x00000000U, 0xe9528d85U>
    sfmt86243_64;


  typedef simd_fast_mersenne_twister_engine<uint32_t, 132049, 110,
					    19, 1, 21, 1,
					    0xffffbb5fU, 0xfb6ebf95U,
					    0xfffefffaU, 0xcff77fffU,
					    0x00000001U, 0x00000000U,
					    0xcb520000U, 0xc7e91c7dU>
    sfmt132049;

  typedef simd_fast_mersenne_twister_engine<uint64_t, 132049, 110,
					    19, 1, 21, 1,
					    0xffffbb5fU, 0xfb6ebf95U,
					    0xfffefffaU, 0xcff77fffU,
					    0x00000001U, 0x00000000U,
					    0xcb520000U, 0xc7e91c7dU>
    sfmt132049_64;


  typedef simd_fast_mersenne_twister_engine<uint32_t, 216091, 627,
					    11, 3, 10, 1,
					    0xbff7bff7U, 0xbfffffffU,
					    0xbffffa7fU, 0xffddfbfbU,
					    0xf8000001U, 0x89e80709U,
					    0x3bd2b64bU, 0x0c64b1e4U>
    sfmt216091;

  typedef simd_fast_mersenne_twister_engine<uint64_t, 216091, 627,
					    11, 3, 10, 1,
					    0xbff7bff7U, 0xbfffffffU,
					    0xbffffa7fU, 0xffddfbfbU,
					    0xf8000001U, 0x89e80709U,
					    0x3bd2b64bU, 0x0c64b1e4U>
    sfmt216091_64;

#endif // __BYTE_ORDER__ == __ORDER_LITTLE_ENDIAN__

  /**
   * @brief A beta continuous distribution for random numbers.
   *
   * The formula for the beta probability density function is:
   * @f[
   *     p(x|\alpha,\beta) = \frac{1}{B(\alpha,\beta)}
   *                         x^{\alpha - 1} (1 - x)^{\beta - 1}
   * @f]
   */
  template<typename _RealType = double>
    class beta_distribution
    {
      static_assert(std::is_floating_point<_RealType>::value,
		    "template argument not a floating point type");

    public:
      /** The type of the range of the distribution. */
      typedef _RealType result_type;
      /** Parameter type. */
      struct param_type
      {
	typedef beta_distribution<_RealType> distribution_type;
	friend class beta_distribution<_RealType>;

	explicit
	param_type(_RealType __alpha_val = _RealType(1),
		   _RealType __beta_val = _RealType(1))
	: _M_alpha(__alpha_val), _M_beta(__beta_val)
	{
	  __glibcxx_assert(_M_alpha > _RealType(0));
	  __glibcxx_assert(_M_beta > _RealType(0));
	}

	_RealType
	alpha() const
	{ return _M_alpha; }

	_RealType
	beta() const
	{ return _M_beta; }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return (__p1._M_alpha == __p2._M_alpha
		  && __p1._M_beta == __p2._M_beta); }

      private:
	void
	_M_initialize();

	_RealType _M_alpha;
	_RealType _M_beta;
      };

    public:
      /**
       * @brief Constructs a beta distribution with parameters
       * @f$\alpha@f$ and @f$\beta@f$.
       */
      explicit
      beta_distribution(_RealType __alpha_val = _RealType(1),
			_RealType __beta_val = _RealType(1))
      : _M_param(__alpha_val, __beta_val)
      { }

      explicit
      beta_distribution(const param_type& __p)
      : _M_param(__p)
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      { }

      /**
       * @brief Returns the @f$\alpha@f$ of the distribution.
       */
      _RealType
      alpha() const
      { return _M_param.alpha(); }

      /**
       * @brief Returns the @f$\beta@f$ of the distribution.
       */
      _RealType
      beta() const
      { return _M_param.beta(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return _M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { _M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       */
      result_type
      min() const
      { return result_type(0); }

      /**
       * @brief Returns the least upper bound value of the distribution.
       */
      result_type
      max() const
      { return result_type(1); }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng)
	{ return this->operator()(__urng, _M_param); }

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng,
		   const param_type& __p);

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ this->__generate(__f, __t, __urng, _M_param); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      template<typename _UniformRandomNumberGenerator>
	void
	__generate(result_type* __f, result_type* __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      /**
       * @brief Return true if two beta distributions have the same
       *        parameters and the sequences that would be generated
       *        are equal.
       */
      friend bool
      operator==(const beta_distribution& __d1,
		 const beta_distribution& __d2)
      { return __d1._M_param == __d2._M_param; }

      /**
       * @brief Inserts a %beta_distribution random number distribution
       * @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %beta_distribution random number distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>& __os,
		   const __gnu_cxx::beta_distribution<_RealType1>& __x);

      /**
       * @brief Extracts a %beta_distribution random number distribution
       * @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x  A %beta_distribution random number generator engine.
       *
       * @returns The input stream with @p __x extracted or in an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>& __is,
		   __gnu_cxx::beta_distribution<_RealType1>& __x);

    private:
      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;
    };

  /**
   * @brief Return true if two beta distributions are different.
   */
  template<typename _RealType>
    inline bool
    operator!=(const __gnu_cxx::beta_distribution<_RealType>& __d1,
	       const __gnu_cxx::beta_distribution<_RealType>& __d2)
    { return !(__d1 == __d2); }


  /**
   * @brief A multi-variate normal continuous distribution for random numbers.
   *
   * The formula for the normal probability density function is
   * @f[
   *     p(\overrightarrow{x}|\overrightarrow{\mu },\Sigma) =
   *       \frac{1}{\sqrt{(2\pi )^k\det(\Sigma))}}
   *       e^{-\frac{1}{2}(\overrightarrow{x}-\overrightarrow{\mu})^\text{T}
   *          \Sigma ^{-1}(\overrightarrow{x}-\overrightarrow{\mu})}
   * @f]
   *
   * where @f$\overrightarrow{x}@f$ and @f$\overrightarrow{\mu}@f$ are
   * vectors of dimension @f$k@f$ and @f$\Sigma@f$ is the covariance
   * matrix (which must be positive-definite).
   */
  template<std::size_t _Dimen, typename _RealType = double>
    class normal_mv_distribution
    {
      static_assert(std::is_floating_point<_RealType>::value,
		    "template argument not a floating point type");
      static_assert(_Dimen != 0, "dimension is zero");

    public:
      /** The type of the range of the distribution. */
      typedef std::array<_RealType, _Dimen> result_type;
      /** Parameter type. */
      class param_type
      {
	static constexpr size_t _M_t_size = _Dimen * (_Dimen + 1) / 2;

      public:
	typedef normal_mv_distribution<_Dimen, _RealType> distribution_type;
	friend class normal_mv_distribution<_Dimen, _RealType>;

	param_type()
	{
	  std::fill(_M_mean.begin(), _M_mean.end(), _RealType(0));
	  auto __it = _M_t.begin();
	  for (size_t __i = 0; __i < _Dimen; ++__i)
	    {
	      std::fill_n(__it, __i, _RealType(0));
	      __it += __i;
	      *__it++ = _RealType(1);
	    }
	}

	template<typename _ForwardIterator1, typename _ForwardIterator2>
	  param_type(_ForwardIterator1 __meanbegin,
		     _ForwardIterator1 __meanend,
		     _ForwardIterator2 __varcovbegin,
		     _ForwardIterator2 __varcovend)
	{
	  __glibcxx_function_requires(_ForwardIteratorConcept<
				      _ForwardIterator1>)
	  __glibcxx_function_requires(_ForwardIteratorConcept<
				      _ForwardIterator2>)
	  _GLIBCXX_DEBUG_ASSERT(std::distance(__meanbegin, __meanend)
				<= _Dimen);
	  const auto __dist = std::distance(__varcovbegin, __varcovend);
	  _GLIBCXX_DEBUG_ASSERT(__dist == _Dimen * _Dimen
				|| __dist == _Dimen * (_Dimen + 1) / 2
				|| __dist == _Dimen);

	  if (__dist == _Dimen * _Dimen)
	    _M_init_full(__meanbegin, __meanend, __varcovbegin, __varcovend);
	  else if (__dist == _Dimen * (_Dimen + 1) / 2)
	    _M_init_lower(__meanbegin, __meanend, __varcovbegin, __varcovend);
	  else
	    {
	      __glibcxx_assert(__dist == _Dimen);
	      _M_init_diagonal(__meanbegin, __meanend,
			       __varcovbegin, __varcovend);
	    }
	}

	param_type(std::initializer_list<_RealType> __mean,
		   std::initializer_list<_RealType> __varcov)
	{
	  _GLIBCXX_DEBUG_ASSERT(__mean.size() <= _Dimen);
	  _GLIBCXX_DEBUG_ASSERT(__varcov.size() == _Dimen * _Dimen
				|| __varcov.size() == _Dimen * (_Dimen + 1) / 2
				|| __varcov.size() == _Dimen);

	  if (__varcov.size() == _Dimen * _Dimen)
	    _M_init_full(__mean.begin(), __mean.end(),
			 __varcov.begin(), __varcov.end());
	  else if (__varcov.size() == _Dimen * (_Dimen + 1) / 2)
	    _M_init_lower(__mean.begin(), __mean.end(),
			  __varcov.begin(), __varcov.end());
	  else
	    {
	      __glibcxx_assert(__varcov.size() == _Dimen);
	      _M_init_diagonal(__mean.begin(), __mean.end(),
			       __varcov.begin(), __varcov.end());
	    }
	}

	std::array<_RealType, _Dimen>
	mean() const
	{ return _M_mean; }

	std::array<_RealType, _M_t_size>
	varcov() const
	{ return _M_t; }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return __p1._M_mean == __p2._M_mean && __p1._M_t == __p2._M_t; }

      private:
	template <typename _InputIterator1, typename _InputIterator2>
	  void _M_init_full(_InputIterator1 __meanbegin,
			    _InputIterator1 __meanend,
			    _InputIterator2 __varcovbegin,
			    _InputIterator2 __varcovend);
	template <typename _InputIterator1, typename _InputIterator2>
	  void _M_init_lower(_InputIterator1 __meanbegin,
			     _InputIterator1 __meanend,
			     _InputIterator2 __varcovbegin,
			     _InputIterator2 __varcovend);
	template <typename _InputIterator1, typename _InputIterator2>
	  void _M_init_diagonal(_InputIterator1 __meanbegin,
				_InputIterator1 __meanend,
				_InputIterator2 __varbegin,
				_InputIterator2 __varend);

	std::array<_RealType, _Dimen> _M_mean;
	std::array<_RealType, _M_t_size> _M_t;
      };

    public:
      normal_mv_distribution()
      : _M_param(), _M_nd()
      { }

      template<typename _ForwardIterator1, typename _ForwardIterator2>
	normal_mv_distribution(_ForwardIterator1 __meanbegin,
			       _ForwardIterator1 __meanend,
			       _ForwardIterator2 __varcovbegin,
			       _ForwardIterator2 __varcovend)
	: _M_param(__meanbegin, __meanend, __varcovbegin, __varcovend),
	  _M_nd()
	{ }

      normal_mv_distribution(std::initializer_list<_RealType> __mean,
			     std::initializer_list<_RealType> __varcov)
      : _M_param(__mean, __varcov), _M_nd()
      { }

      explicit
      normal_mv_distribution(const param_type& __p)
      : _M_param(__p), _M_nd()
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      { _M_nd.reset(); }

      /**
       * @brief Returns the mean of the distribution.
       */
      result_type
      mean() const
      { return _M_param.mean(); }

      /**
       * @brief Returns the compact form of the variance/covariance
       * matrix of the distribution.
       */
      std::array<_RealType, _Dimen * (_Dimen + 1) / 2>
      varcov() const
      { return _M_param.varcov(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return _M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { _M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       */
      result_type
      min() const
      { result_type __res;
	__res.fill(std::numeric_limits<_RealType>::lowest());
	return __res; }

      /**
       * @brief Returns the least upper bound value of the distribution.
       */
      result_type
      max() const
      { result_type __res;
	__res.fill(std::numeric_limits<_RealType>::max());
	return __res; }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng)
	{ return this->operator()(__urng, _M_param); }

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng,
		   const param_type& __p);

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ return this->__generate_impl(__f, __t, __urng, _M_param); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ return this->__generate_impl(__f, __t, __urng, __p); }

      /**
       * @brief Return true if two multi-variant normal distributions have
       *        the same parameters and the sequences that would
       *        be generated are equal.
       */
      template<size_t _Dimen1, typename _RealType1>
	friend bool
	operator==(const
		   __gnu_cxx::normal_mv_distribution<_Dimen1, _RealType1>&
		   __d1,
		   const
		   __gnu_cxx::normal_mv_distribution<_Dimen1, _RealType1>&
		   __d2);

      /**
       * @brief Inserts a %normal_mv_distribution random number distribution
       * @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %normal_mv_distribution random number distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<size_t _Dimen1, typename _RealType1,
	       typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>& __os,
		   const
		   __gnu_cxx::normal_mv_distribution<_Dimen1, _RealType1>&
		   __x);

      /**
       * @brief Extracts a %normal_mv_distribution random number distribution
       * @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x  A %normal_mv_distribution random number generator engine.
       *
       * @returns The input stream with @p __x extracted or in an error
       *          state.
       */
      template<size_t _Dimen1, typename _RealType1,
	       typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>& __is,
		   __gnu_cxx::normal_mv_distribution<_Dimen1, _RealType1>&
		   __x);

    private:
      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;
      std::normal_distribution<_RealType> _M_nd;
  };

  /**
   * @brief Return true if two multi-variate normal distributions are
   * different.
   */
  template<size_t _Dimen, typename _RealType>
    inline bool
    operator!=(const __gnu_cxx::normal_mv_distribution<_Dimen, _RealType>&
	       __d1,
	       const __gnu_cxx::normal_mv_distribution<_Dimen, _RealType>&
	       __d2)
    { return !(__d1 == __d2); }


  /**
   * @brief A Rice continuous distribution for random numbers.
   *
   * The formula for the Rice probability density function is
   * @f[
   *     p(x|\nu,\sigma) = \frac{x}{\sigma^2}
   *                       \exp\left(-\frac{x^2+\nu^2}{2\sigma^2}\right)
   *                       I_0\left(\frac{x \nu}{\sigma^2}\right)
   * @f]
   * where @f$I_0(z)@f$ is the modified Bessel function of the first kind
   * of order 0 and @f$\nu >= 0@f$ and @f$\sigma > 0@f$.
   *
   * <table border=1 cellpadding=10 cellspacing=0>
   * <caption align=top>Distribution Statistics</caption>
   * <tr><td>Mean</td><td>@f$\sqrt{\pi/2}L_{1/2}(-\nu^2/2\sigma^2)@f$</td></tr>
   * <tr><td>Variance</td><td>@f$2\sigma^2 + \nu^2
   *                   + (\pi\sigma^2/2)L^2_{1/2}(-\nu^2/2\sigma^2)@f$</td></tr>
   * <tr><td>Range</td><td>@f$[0, \infty)@f$</td></tr>
   * </table>
   * where @f$L_{1/2}(x)@f$ is the Laguerre polynomial of order 1/2.
   */
  template<typename _RealType = double>
    class
    rice_distribution
    {
      static_assert(std::is_floating_point<_RealType>::value,
		    "template argument not a floating point type");
    public:
      /** The type of the range of the distribution. */
      typedef _RealType result_type;
      /** Parameter type. */
      struct param_type
      {
	typedef rice_distribution<result_type> distribution_type;

	param_type(result_type __nu_val = result_type(0),
		   result_type __sigma_val = result_type(1))
	: _M_nu(__nu_val), _M_sigma(__sigma_val)
	{
	  __glibcxx_assert(_M_nu >= result_type(0));
	  __glibcxx_assert(_M_sigma > result_type(0));
	}

	result_type
	nu() const
	{ return _M_nu; }

	result_type
	sigma() const
	{ return _M_sigma; }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return __p1._M_nu == __p2._M_nu
	      && __p1._M_sigma == __p2._M_sigma; }

      private:
	void _M_initialize();

	result_type _M_nu;
	result_type _M_sigma;
      };

      /**
       * @brief Constructors.
       */
      explicit
      rice_distribution(result_type __nu_val = result_type(0),
			result_type __sigma_val = result_type(1))
      : _M_param(__nu_val, __sigma_val),
	_M_ndx(__nu_val, __sigma_val),
	_M_ndy(result_type(0), __sigma_val)
      { }

      explicit
      rice_distribution(const param_type& __p)
      : _M_param(__p),
	_M_ndx(__p.nu(), __p.sigma()),
	_M_ndy(result_type(0), __p.sigma())
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      {
	_M_ndx.reset();
	_M_ndy.reset();
      }

      /**
       * @brief Return the parameters of the distribution.
       */
      result_type
      nu() const
      { return _M_param.nu(); }

      result_type
      sigma() const
      { return _M_param.sigma(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return _M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { _M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       */
      result_type
      min() const
      { return result_type(0); }

      /**
       * @brief Returns the least upper bound value of the distribution.
       */
      result_type
      max() const
      { return std::numeric_limits<result_type>::max(); }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng)
	{
	  result_type __x = this->_M_ndx(__urng);
	  result_type __y = this->_M_ndy(__urng);
#if _GLIBCXX_USE_C99_MATH_TR1
	  return std::hypot(__x, __y);
#else
	  return std::sqrt(__x * __x + __y * __y);
#endif
	}

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{
	  typename std::normal_distribution<result_type>::param_type
	    __px(__p.nu(), __p.sigma()), __py(result_type(0), __p.sigma());
	  result_type __x = this->_M_ndx(__px, __urng);
	  result_type __y = this->_M_ndy(__py, __urng);
#if _GLIBCXX_USE_C99_MATH_TR1
	  return std::hypot(__x, __y);
#else
	  return std::sqrt(__x * __x + __y * __y);
#endif
	}

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ this->__generate(__f, __t, __urng, _M_param); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      template<typename _UniformRandomNumberGenerator>
	void
	__generate(result_type* __f, result_type* __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      /**
       * @brief Return true if two Rice distributions have
       *        the same parameters and the sequences that would
       *        be generated are equal.
       */
      friend bool
      operator==(const rice_distribution& __d1,
		 const rice_distribution& __d2)
      { return (__d1._M_param == __d2._M_param
		&& __d1._M_ndx == __d2._M_ndx
		&& __d1._M_ndy == __d2._M_ndy); }

      /**
       * @brief Inserts a %rice_distribution random number distribution
       * @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %rice_distribution random number distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>&,
		   const rice_distribution<_RealType1>&);

      /**
       * @brief Extracts a %rice_distribution random number distribution
       * @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x A %rice_distribution random number
       *            generator engine.
       *
       * @returns The input stream with @p __x extracted or in an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>&,
		   rice_distribution<_RealType1>&);

    private:
      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;

      std::normal_distribution<result_type> _M_ndx;
      std::normal_distribution<result_type> _M_ndy;
    };

  /**
   * @brief Return true if two Rice distributions are not equal.
   */
  template<typename _RealType1>
    inline bool
    operator!=(const rice_distribution<_RealType1>& __d1,
	       const rice_distribution<_RealType1>& __d2)
    { return !(__d1 == __d2); }


  /**
   * @brief A Nakagami continuous distribution for random numbers.
   *
   * The formula for the Nakagami probability density function is
   * @f[
   *     p(x|\mu,\omega) = \frac{2\mu^\mu}{\Gamma(\mu)\omega^\mu}
   *                       x^{2\mu-1}e^{-\mu x / \omega}
   * @f]
   * where @f$\Gamma(z)@f$ is the gamma function and @f$\mu >= 0.5@f$
   * and @f$\omega > 0@f$.
   */
  template<typename _RealType = double>
    class
    nakagami_distribution
    {
      static_assert(std::is_floating_point<_RealType>::value,
		    "template argument not a floating point type");

    public:
      /** The type of the range of the distribution. */
      typedef _RealType result_type;
      /** Parameter type. */
      struct param_type
      {
	typedef nakagami_distribution<result_type> distribution_type;

	param_type(result_type __mu_val = result_type(1),
		   result_type __omega_val = result_type(1))
	: _M_mu(__mu_val), _M_omega(__omega_val)
	{
	  __glibcxx_assert(_M_mu >= result_type(0.5L));
	  __glibcxx_assert(_M_omega > result_type(0));
	}

	result_type
	mu() const
	{ return _M_mu; }

	result_type
	omega() const
	{ return _M_omega; }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return __p1._M_mu == __p2._M_mu
	      && __p1._M_omega == __p2._M_omega; }

      private:
	void _M_initialize();

	result_type _M_mu;
	result_type _M_omega;
      };

      /**
       * @brief Constructors.
       */
      explicit
      nakagami_distribution(result_type __mu_val = result_type(1),
			    result_type __omega_val = result_type(1))
      : _M_param(__mu_val, __omega_val),
	_M_gd(__mu_val, __omega_val / __mu_val)
      { }

      explicit
      nakagami_distribution(const param_type& __p)
      : _M_param(__p),
	_M_gd(__p.mu(), __p.omega() / __p.mu())
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      { _M_gd.reset(); }

      /**
       * @brief Return the parameters of the distribution.
       */
      result_type
      mu() const
      { return _M_param.mu(); }

      result_type
      omega() const
      { return _M_param.omega(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return _M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { _M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       */
      result_type
      min() const
      { return result_type(0); }

      /**
       * @brief Returns the least upper bound value of the distribution.
       */
      result_type
      max() const
      { return std::numeric_limits<result_type>::max(); }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng)
	{ return std::sqrt(this->_M_gd(__urng)); }

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{
	  typename std::gamma_distribution<result_type>::param_type
	    __pg(__p.mu(), __p.omega() / __p.mu());
	  return std::sqrt(this->_M_gd(__pg, __urng));
	}

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ this->__generate(__f, __t, __urng, _M_param); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      template<typename _UniformRandomNumberGenerator>
	void
	__generate(result_type* __f, result_type* __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      /**
       * @brief Return true if two Nakagami distributions have
       *        the same parameters and the sequences that would
       *        be generated are equal.
       */
      friend bool
      operator==(const nakagami_distribution& __d1,
		 const nakagami_distribution& __d2)
      { return (__d1._M_param == __d2._M_param
		&& __d1._M_gd == __d2._M_gd); }

      /**
       * @brief Inserts a %nakagami_distribution random number distribution
       * @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %nakagami_distribution random number distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>&,
		   const nakagami_distribution<_RealType1>&);

      /**
       * @brief Extracts a %nakagami_distribution random number distribution
       * @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x A %nakagami_distribution random number
       *            generator engine.
       *
       * @returns The input stream with @p __x extracted or in an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>&,
		   nakagami_distribution<_RealType1>&);

    private:
      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;

      std::gamma_distribution<result_type> _M_gd;
    };

  /**
   * @brief Return true if two Nakagami distributions are not equal.
   */
  template<typename _RealType>
    inline bool
    operator!=(const nakagami_distribution<_RealType>& __d1,
	       const nakagami_distribution<_RealType>& __d2)
    { return !(__d1 == __d2); }


  /**
   * @brief A Pareto continuous distribution for random numbers.
   *
   * The formula for the Pareto cumulative probability function is
   * @f[
   *     P(x|\alpha,\mu) = 1 - \left(\frac{\mu}{x}\right)^\alpha
   * @f]
   * The formula for the Pareto probability density function is
   * @f[
   *     p(x|\alpha,\mu) = \frac{\alpha + 1}{\mu}
   *                       \left(\frac{\mu}{x}\right)^{\alpha + 1}
   * @f]
   * where @f$x >= \mu@f$ and @f$\mu > 0@f$, @f$\alpha > 0@f$.
   *
   * <table border=1 cellpadding=10 cellspacing=0>
   * <caption align=top>Distribution Statistics</caption>
   * <tr><td>Mean</td><td>@f$\alpha \mu / (\alpha - 1)@f$
   *              for @f$\alpha > 1@f$</td></tr>
   * <tr><td>Variance</td><td>@f$\alpha \mu^2 / [(\alpha - 1)^2(\alpha - 2)]@f$
   *              for @f$\alpha > 2@f$</td></tr>
   * <tr><td>Range</td><td>@f$[\mu, \infty)@f$</td></tr>
   * </table>
   */
  template<typename _RealType = double>
    class
    pareto_distribution
    {
      static_assert(std::is_floating_point<_RealType>::value,
		    "template argument not a floating point type");

    public:
      /** The type of the range of the distribution. */
      typedef _RealType result_type;
      /** Parameter type. */
      struct param_type
      {
	typedef pareto_distribution<result_type> distribution_type;

	param_type(result_type __alpha_val = result_type(1),
		   result_type __mu_val = result_type(1))
	: _M_alpha(__alpha_val), _M_mu(__mu_val)
	{
	  __glibcxx_assert(_M_alpha > result_type(0));
	  __glibcxx_assert(_M_mu > result_type(0));
	}

	result_type
	alpha() const
	{ return _M_alpha; }

	result_type
	mu() const
	{ return _M_mu; }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return __p1._M_alpha == __p2._M_alpha && __p1._M_mu == __p2._M_mu; }

      private:
	void _M_initialize();

	result_type _M_alpha;
	result_type _M_mu;
      };

      /**
       * @brief Constructors.
       */
      explicit
      pareto_distribution(result_type __alpha_val = result_type(1),
			  result_type __mu_val = result_type(1))
      : _M_param(__alpha_val, __mu_val),
	_M_ud()
      { }

      explicit
      pareto_distribution(const param_type& __p)
      : _M_param(__p),
	_M_ud()
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      {
	_M_ud.reset();
      }

      /**
       * @brief Return the parameters of the distribution.
       */
      result_type
      alpha() const
      { return _M_param.alpha(); }

      result_type
      mu() const
      { return _M_param.mu(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return _M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { _M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       */
      result_type
      min() const
      { return this->mu(); }

      /**
       * @brief Returns the least upper bound value of the distribution.
       */
      result_type
      max() const
      { return std::numeric_limits<result_type>::max(); }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng)
	{
	  return this->mu() * std::pow(this->_M_ud(__urng),
				       -result_type(1) / this->alpha());
	}

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{
	  return __p.mu() * std::pow(this->_M_ud(__urng),
					   -result_type(1) / __p.alpha());
	}

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ this->__generate(__f, __t, __urng, _M_param); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      template<typename _UniformRandomNumberGenerator>
	void
	__generate(result_type* __f, result_type* __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      /**
       * @brief Return true if two Pareto distributions have
       *        the same parameters and the sequences that would
       *        be generated are equal.
       */
      friend bool
      operator==(const pareto_distribution& __d1,
		 const pareto_distribution& __d2)
      { return (__d1._M_param == __d2._M_param
		&& __d1._M_ud == __d2._M_ud); }

      /**
       * @brief Inserts a %pareto_distribution random number distribution
       * @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %pareto_distribution random number distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>&,
		   const pareto_distribution<_RealType1>&);

      /**
       * @brief Extracts a %pareto_distribution random number distribution
       * @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x A %pareto_distribution random number
       *            generator engine.
       *
       * @returns The input stream with @p __x extracted or in an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>&,
		   pareto_distribution<_RealType1>&);

    private:
      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;

      std::uniform_real_distribution<result_type> _M_ud;
    };

  /**
   * @brief Return true if two Pareto distributions are not equal.
   */
  template<typename _RealType>
    inline bool
    operator!=(const pareto_distribution<_RealType>& __d1,
	       const pareto_distribution<_RealType>& __d2)
    { return !(__d1 == __d2); }


  /**
   * @brief A K continuous distribution for random numbers.
   *
   * The formula for the K probability density function is
   * @f[
   *     p(x|\lambda, \mu, \nu) = \frac{2}{x}
   *             \left(\frac{\lambda\nu x}{\mu}\right)^{\frac{\lambda + \nu}{2}}
   *             \frac{1}{\Gamma(\lambda)\Gamma(\nu)}
   *             K_{\nu - \lambda}\left(2\sqrt{\frac{\lambda\nu x}{\mu}}\right)
   * @f]
   * where @f$I_0(z)@f$ is the modified Bessel function of the second kind
   * of order @f$\nu - \lambda@f$ and @f$\lambda > 0@f$, @f$\mu > 0@f$
   * and @f$\nu > 0@f$.
   *
   * <table border=1 cellpadding=10 cellspacing=0>
   * <caption align=top>Distribution Statistics</caption>
   * <tr><td>Mean</td><td>@f$\mu@f$</td></tr>
   * <tr><td>Variance</td><td>@f$\mu^2\frac{\lambda + \nu + 1}{\lambda\nu}@f$</td></tr>
   * <tr><td>Range</td><td>@f$[0, \infty)@f$</td></tr>
   * </table>
   */
  template<typename _RealType = double>
    class
    k_distribution
    {
      static_assert(std::is_floating_point<_RealType>::value,
		    "template argument not a floating point type");

    public:
      /** The type of the range of the distribution. */
      typedef _RealType result_type;
      /** Parameter type. */
      struct param_type
      {
	typedef k_distribution<result_type> distribution_type;

	param_type(result_type __lambda_val = result_type(1),
		   result_type __mu_val = result_type(1),
		   result_type __nu_val = result_type(1))
	: _M_lambda(__lambda_val), _M_mu(__mu_val), _M_nu(__nu_val)
	{
	  __glibcxx_assert(_M_lambda > result_type(0));
	  __glibcxx_assert(_M_mu > result_type(0));
	  __glibcxx_assert(_M_nu > result_type(0));
	}

	result_type
	lambda() const
	{ return _M_lambda; }

	result_type
	mu() const
	{ return _M_mu; }

	result_type
	nu() const
	{ return _M_nu; }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return __p1._M_lambda == __p2._M_lambda
	      && __p1._M_mu == __p2._M_mu
	      && __p1._M_nu == __p2._M_nu; }

      private:
	void _M_initialize();

	result_type _M_lambda;
	result_type _M_mu;
	result_type _M_nu;
      };

      /**
       * @brief Constructors.
       */
      explicit
      k_distribution(result_type __lambda_val = result_type(1),
		     result_type __mu_val = result_type(1),
		     result_type __nu_val = result_type(1))
      : _M_param(__lambda_val, __mu_val, __nu_val),
	_M_gd1(__lambda_val, result_type(1) / __lambda_val),
	_M_gd2(__nu_val, __mu_val / __nu_val)
      { }

      explicit
      k_distribution(const param_type& __p)
      : _M_param(__p),
	_M_gd1(__p.lambda(), result_type(1) / __p.lambda()),
	_M_gd2(__p.nu(), __p.mu() / __p.nu())
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      {
	_M_gd1.reset();
	_M_gd2.reset();
      }

      /**
       * @brief Return the parameters of the distribution.
       */
      result_type
      lambda() const
      { return _M_param.lambda(); }

      result_type
      mu() const
      { return _M_param.mu(); }

      result_type
      nu() const
      { return _M_param.nu(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return _M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { _M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       */
      result_type
      min() const
      { return result_type(0); }

      /**
       * @brief Returns the least upper bound value of the distribution.
       */
      result_type
      max() const
      { return std::numeric_limits<result_type>::max(); }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator&);

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator&, const param_type&);

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ this->__generate(__f, __t, __urng, _M_param); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      template<typename _UniformRandomNumberGenerator>
	void
	__generate(result_type* __f, result_type* __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      /**
       * @brief Return true if two K distributions have
       *        the same parameters and the sequences that would
       *        be generated are equal.
       */
      friend bool
      operator==(const k_distribution& __d1,
		 const k_distribution& __d2)
      { return (__d1._M_param == __d2._M_param
		&& __d1._M_gd1 == __d2._M_gd1
		&& __d1._M_gd2 == __d2._M_gd2); }

      /**
       * @brief Inserts a %k_distribution random number distribution
       * @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %k_distribution random number distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>&,
		   const k_distribution<_RealType1>&);

      /**
       * @brief Extracts a %k_distribution random number distribution
       * @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x A %k_distribution random number
       *            generator engine.
       *
       * @returns The input stream with @p __x extracted or in an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>&,
		   k_distribution<_RealType1>&);

    private:
      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;

      std::gamma_distribution<result_type> _M_gd1;
      std::gamma_distribution<result_type> _M_gd2;
    };

  /**
   * @brief Return true if two K distributions are not equal.
   */
  template<typename _RealType>
    inline bool
    operator!=(const k_distribution<_RealType>& __d1,
	       const k_distribution<_RealType>& __d2)
    { return !(__d1 == __d2); }


  /**
   * @brief An arcsine continuous distribution for random numbers.
   *
   * The formula for the arcsine probability density function is
   * @f[
   *     p(x|a,b) = \frac{1}{\pi \sqrt{(x - a)(b - x)}}
   * @f]
   * where @f$x >= a@f$ and @f$x <= b@f$.
   *
   * <table border=1 cellpadding=10 cellspacing=0>
   * <caption align=top>Distribution Statistics</caption>
   * <tr><td>Mean</td><td>@f$ (a + b) / 2 @f$</td></tr>
   * <tr><td>Variance</td><td>@f$ (b - a)^2 / 8 @f$</td></tr>
   * <tr><td>Range</td><td>@f$[a, b]@f$</td></tr>
   * </table>
   */
  template<typename _RealType = double>
    class
    arcsine_distribution
    {
      static_assert(std::is_floating_point<_RealType>::value,
		    "template argument not a floating point type");

    public:
      /** The type of the range of the distribution. */
      typedef _RealType result_type;
      /** Parameter type. */
      struct param_type
      {
	typedef arcsine_distribution<result_type> distribution_type;

	param_type(result_type __a = result_type(0),
		   result_type __b = result_type(1))
	: _M_a(__a), _M_b(__b)
	{
	  __glibcxx_assert(_M_a <= _M_b);
	}

	result_type
	a() const
	{ return _M_a; }

	result_type
	b() const
	{ return _M_b; }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return __p1._M_a == __p2._M_a && __p1._M_b == __p2._M_b; }

      private:
	void _M_initialize();

	result_type _M_a;
	result_type _M_b;
      };

      /**
       * @brief Constructors.
       */
      explicit
      arcsine_distribution(result_type __a = result_type(0),
			   result_type __b = result_type(1))
      : _M_param(__a, __b),
	_M_ud(-1.5707963267948966192313216916397514L,
	      +1.5707963267948966192313216916397514L)
      { }

      explicit
      arcsine_distribution(const param_type& __p)
      : _M_param(__p),
	_M_ud(-1.5707963267948966192313216916397514L,
	      +1.5707963267948966192313216916397514L)
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      { _M_ud.reset(); }

      /**
       * @brief Return the parameters of the distribution.
       */
      result_type
      a() const
      { return _M_param.a(); }

      result_type
      b() const
      { return _M_param.b(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return _M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { _M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       */
      result_type
      min() const
      { return this->a(); }

      /**
       * @brief Returns the least upper bound value of the distribution.
       */
      result_type
      max() const
      { return this->b(); }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng)
	{
	  result_type __x = std::sin(this->_M_ud(__urng));
	  return (__x * (this->b() - this->a())
		  + this->a() + this->b()) / result_type(2);
	}

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{
	  result_type __x = std::sin(this->_M_ud(__urng));
	  return (__x * (__p.b() - __p.a())
		  + __p.a() + __p.b()) / result_type(2);
	}

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ this->__generate(__f, __t, __urng, _M_param); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      template<typename _UniformRandomNumberGenerator>
	void
	__generate(result_type* __f, result_type* __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      /**
       * @brief Return true if two arcsine distributions have
       *        the same parameters and the sequences that would
       *        be generated are equal.
       */
      friend bool
      operator==(const arcsine_distribution& __d1,
		 const arcsine_distribution& __d2)
      { return (__d1._M_param == __d2._M_param
		&& __d1._M_ud == __d2._M_ud); }

      /**
       * @brief Inserts a %arcsine_distribution random number distribution
       * @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %arcsine_distribution random number distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>&,
		   const arcsine_distribution<_RealType1>&);

      /**
       * @brief Extracts a %arcsine_distribution random number distribution
       * @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x A %arcsine_distribution random number
       *            generator engine.
       *
       * @returns The input stream with @p __x extracted or in an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>&,
		   arcsine_distribution<_RealType1>&);

    private:
      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;

      std::uniform_real_distribution<result_type> _M_ud;
    };

  /**
   * @brief Return true if two arcsine distributions are not equal.
   */
  template<typename _RealType>
    inline bool
    operator!=(const arcsine_distribution<_RealType>& __d1,
	       const arcsine_distribution<_RealType>& __d2)
    { return !(__d1 == __d2); }


  /**
   * @brief A Hoyt continuous distribution for random numbers.
   *
   * The formula for the Hoyt probability density function is
   * @f[
   *     p(x|q,\omega) = \frac{(1 + q^2)x}{q\omega}
   *                     \exp\left(-\frac{(1 + q^2)^2 x^2}{4 q^2 \omega}\right)
   *                       I_0\left(\frac{(1 - q^4) x^2}{4 q^2 \omega}\right)
   * @f]
   * where @f$I_0(z)@f$ is the modified Bessel function of the first kind
   * of order 0 and @f$0 < q < 1@f$.
   *
   * <table border=1 cellpadding=10 cellspacing=0>
   * <caption align=top>Distribution Statistics</caption>
   * <tr><td>Mean</td><td>@f$ \sqrt{\frac{2}{\pi}} \sqrt{\frac{\omega}{1 + q^2}}
   *                       E(1 - q^2) @f$</td></tr>
   * <tr><td>Variance</td><td>@f$ \omega \left(1 - \frac{2E^2(1 - q^2)}
   *                                      {\pi (1 + q^2)}\right) @f$</td></tr>
   * <tr><td>Range</td><td>@f$[0, \infty)@f$</td></tr>
   * </table>
   * where @f$E(x)@f$ is the elliptic function of the second kind.
   */
  template<typename _RealType = double>
    class
    hoyt_distribution
    {
      static_assert(std::is_floating_point<_RealType>::value,
		    "template argument not a floating point type");

    public:
      /** The type of the range of the distribution. */
      typedef _RealType result_type;
      /** Parameter type. */
      struct param_type
      {
	typedef hoyt_distribution<result_type> distribution_type;

	param_type(result_type __q = result_type(0.5L),
		   result_type __omega = result_type(1))
	: _M_q(__q), _M_omega(__omega)
	{
	  __glibcxx_assert(_M_q > result_type(0));
	  __glibcxx_assert(_M_q < result_type(1));
	}

	result_type
	q() const
	{ return _M_q; }

	result_type
	omega() const
	{ return _M_omega; }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return __p1._M_q == __p2._M_q
	      && __p1._M_omega == __p2._M_omega; }

      private:
	void _M_initialize();

	result_type _M_q;
	result_type _M_omega;
      };

      /**
       * @brief Constructors.
       */
      explicit
      hoyt_distribution(result_type __q = result_type(0.5L),
			result_type __omega = result_type(1))
      : _M_param(__q, __omega),
	_M_ad(result_type(0.5L) * (result_type(1) + __q * __q),
	      result_type(0.5L) * (result_type(1) + __q * __q)
				/ (__q * __q)),
	_M_ed(result_type(1))
      { }

      explicit
      hoyt_distribution(const param_type& __p)
      : _M_param(__p),
	_M_ad(result_type(0.5L) * (result_type(1) + __p.q() * __p.q()),
	      result_type(0.5L) * (result_type(1) + __p.q() * __p.q())
				/ (__p.q() * __p.q())),
	_M_ed(result_type(1))
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      {
	_M_ad.reset();
	_M_ed.reset();
      }

      /**
       * @brief Return the parameters of the distribution.
       */
      result_type
      q() const
      { return _M_param.q(); }

      result_type
      omega() const
      { return _M_param.omega(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return _M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { _M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       */
      result_type
      min() const
      { return result_type(0); }

      /**
       * @brief Returns the least upper bound value of the distribution.
       */
      result_type
      max() const
      { return std::numeric_limits<result_type>::max(); }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng);

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng,
		   const param_type& __p);

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ this->__generate(__f, __t, __urng, _M_param); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      template<typename _UniformRandomNumberGenerator>
	void
	__generate(result_type* __f, result_type* __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      /**
       * @brief Return true if two Hoyt distributions have
       *        the same parameters and the sequences that would
       *        be generated are equal.
       */
      friend bool
      operator==(const hoyt_distribution& __d1,
		 const hoyt_distribution& __d2)
      { return (__d1._M_param == __d2._M_param
		&& __d1._M_ad == __d2._M_ad
		&& __d1._M_ed == __d2._M_ed); }

      /**
       * @brief Inserts a %hoyt_distribution random number distribution
       * @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %hoyt_distribution random number distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>&,
		   const hoyt_distribution<_RealType1>&);

      /**
       * @brief Extracts a %hoyt_distribution random number distribution
       * @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x A %hoyt_distribution random number
       *            generator engine.
       *
       * @returns The input stream with @p __x extracted or in an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>&,
		   hoyt_distribution<_RealType1>&);

    private:
      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;

      __gnu_cxx::arcsine_distribution<result_type> _M_ad;
      std::exponential_distribution<result_type> _M_ed;
    };

  /**
   * @brief Return true if two Hoyt distributions are not equal.
   */
  template<typename _RealType>
    inline bool
    operator!=(const hoyt_distribution<_RealType>& __d1,
	       const hoyt_distribution<_RealType>& __d2)
    { return !(__d1 == __d2); }


  /**
   * @brief A triangular distribution for random numbers.
   *
   * The formula for the triangular probability density function is
   * @f[
   *                  / 0                          for x < a
   *     p(x|a,b,c) = | \frac{2(x-a)}{(c-a)(b-a)}  for a <= x <= b
   *                  | \frac{2(c-x)}{(c-a)(c-b)}  for b < x <= c
   *                  \ 0                          for c < x
   * @f]
   *
   * <table border=1 cellpadding=10 cellspacing=0>
   * <caption align=top>Distribution Statistics</caption>
   * <tr><td>Mean</td><td>@f$ \frac{a+b+c}{2} @f$</td></tr>
   * <tr><td>Variance</td><td>@f$ \frac{a^2+b^2+c^2-ab-ac-bc}
   *                                   {18}@f$</td></tr>
   * <tr><td>Range</td><td>@f$[a, c]@f$</td></tr>
   * </table>
   */
  template<typename _RealType = double>
    class triangular_distribution
    {
      static_assert(std::is_floating_point<_RealType>::value,
		    "template argument not a floating point type");

    public:
      /** The type of the range of the distribution. */
      typedef _RealType result_type;
      /** Parameter type. */
      struct param_type
      {
	friend class triangular_distribution<_RealType>;

	explicit
	param_type(_RealType __a = _RealType(0),
		   _RealType __b = _RealType(0.5),
		   _RealType __c = _RealType(1))
	: _M_a(__a), _M_b(__b), _M_c(__c)
	{
	  __glibcxx_assert(_M_a <= _M_b);
	  __glibcxx_assert(_M_b <= _M_c);
	  __glibcxx_assert(_M_a < _M_c);

	  _M_r_ab = (_M_b - _M_a) / (_M_c - _M_a);
	  _M_f_ab_ac = (_M_b - _M_a) * (_M_c - _M_a);
	  _M_f_bc_ac = (_M_c - _M_b) * (_M_c - _M_a);
	}

	_RealType
	a() const
	{ return _M_a; }

	_RealType
	b() const
	{ return _M_b; }

	_RealType
	c() const
	{ return _M_c; }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return (__p1._M_a == __p2._M_a && __p1._M_b == __p2._M_b
		  && __p1._M_c == __p2._M_c); }

      private:

	_RealType _M_a;
	_RealType _M_b;
	_RealType _M_c;
	_RealType _M_r_ab;
	_RealType _M_f_ab_ac;
	_RealType _M_f_bc_ac;
      };

      /**
       * @brief Constructs a triangle distribution with parameters
       * @f$ a @f$, @f$ b @f$ and @f$ c @f$.
       */
      explicit
      triangular_distribution(result_type __a = result_type(0),
			      result_type __b = result_type(0.5),
			      result_type __c = result_type(1))
      : _M_param(__a, __b, __c)
      { }

      explicit
      triangular_distribution(const param_type& __p)
      : _M_param(__p)
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      { }

      /**
       * @brief Returns the @f$ a @f$ of the distribution.
       */
      result_type
      a() const
      { return _M_param.a(); }

      /**
       * @brief Returns the @f$ b @f$ of the distribution.
       */
      result_type
      b() const
      { return _M_param.b(); }

      /**
       * @brief Returns the @f$ c @f$ of the distribution.
       */
      result_type
      c() const
      { return _M_param.c(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return _M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { _M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       */
      result_type
      min() const
      { return _M_param._M_a; }

      /**
       * @brief Returns the least upper bound value of the distribution.
       */
      result_type
      max() const
      { return _M_param._M_c; }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng)
	{ return this->operator()(__urng, _M_param); }

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{
	  std::__detail::_Adaptor<_UniformRandomNumberGenerator, result_type>
	    __aurng(__urng);
	  result_type __rnd = __aurng();
	  if (__rnd <= __p._M_r_ab)
	    return __p.a() + std::sqrt(__rnd * __p._M_f_ab_ac);
	  else
	    return __p.c() - std::sqrt((result_type(1) - __rnd)
				       * __p._M_f_bc_ac);
	}

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ this->__generate(__f, __t, __urng, _M_param); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      template<typename _UniformRandomNumberGenerator>
	void
	__generate(result_type* __f, result_type* __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      /**
       * @brief Return true if two triangle distributions have the same
       *        parameters and the sequences that would be generated
       *        are equal.
       */
      friend bool
      operator==(const triangular_distribution& __d1,
		 const triangular_distribution& __d2)
      { return __d1._M_param == __d2._M_param; }

      /**
       * @brief Inserts a %triangular_distribution random number distribution
       * @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %triangular_distribution random number distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>& __os,
		   const __gnu_cxx::triangular_distribution<_RealType1>& __x);

      /**
       * @brief Extracts a %triangular_distribution random number distribution
       * @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x  A %triangular_distribution random number generator engine.
       *
       * @returns The input stream with @p __x extracted or in an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>& __is,
		   __gnu_cxx::triangular_distribution<_RealType1>& __x);

    private:
      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;
    };

  /**
   * @brief Return true if two triangle distributions are different.
   */
  template<typename _RealType>
    inline bool
    operator!=(const __gnu_cxx::triangular_distribution<_RealType>& __d1,
	       const __gnu_cxx::triangular_distribution<_RealType>& __d2)
    { return !(__d1 == __d2); }


  /**
   * @brief A von Mises distribution for random numbers.
   *
   * The formula for the von Mises probability density function is
   * @f[
   *     p(x|\mu,\kappa) = \frac{e^{\kappa \cos(x-\mu)}}
   *                            {2\pi I_0(\kappa)}
   * @f]
   *
   * The generating functions use the method according to:
   *
   * D. J. Best and N. I. Fisher, 1979. "Efficient Simulation of the
   * von Mises Distribution", Journal of the Royal Statistical Society.
   * Series C (Applied Statistics), Vol. 28, No. 2, pp. 152-157.
   *
   * <table border=1 cellpadding=10 cellspacing=0>
   * <caption align=top>Distribution Statistics</caption>
   * <tr><td>Mean</td><td>@f$ \mu @f$</td></tr>
   * <tr><td>Variance</td><td>@f$ 1-I_1(\kappa)/I_0(\kappa) @f$</td></tr>
   * <tr><td>Range</td><td>@f$[-\pi, \pi]@f$</td></tr>
   * </table>
   */
  template<typename _RealType = double>
    class von_mises_distribution
    {
      static_assert(std::is_floating_point<_RealType>::value,
		    "template argument not a floating point type");

    public:
      /** The type of the range of the distribution. */
      typedef _RealType result_type;
      /** Parameter type. */
      struct param_type
      {
	friend class von_mises_distribution<_RealType>;

	explicit
	param_type(_RealType __mu = _RealType(0),
		   _RealType __kappa = _RealType(1))
	: _M_mu(__mu), _M_kappa(__kappa)
	{
	  const _RealType __pi = __gnu_cxx::__math_constants<_RealType>::__pi;
	  __glibcxx_assert(_M_mu >= -__pi && _M_mu <= __pi);
	  __glibcxx_assert(_M_kappa >= _RealType(0));

	  auto __tau = std::sqrt(_RealType(4) * _M_kappa * _M_kappa
				 + _RealType(1)) + _RealType(1);
	  auto __rho = ((__tau - std::sqrt(_RealType(2) * __tau))
			/ (_RealType(2) * _M_kappa));
	  _M_r = (_RealType(1) + __rho * __rho) / (_RealType(2) * __rho);
	}

	_RealType
	mu() const
	{ return _M_mu; }

	_RealType
	kappa() const
	{ return _M_kappa; }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return (__p1._M_mu == __p2._M_mu
		  && __p1._M_kappa == __p2._M_kappa); }

      private:
	_RealType _M_mu;
	_RealType _M_kappa;
	_RealType _M_r;
      };

      /**
       * @brief Constructs a von Mises distribution with parameters
       * @f$\mu@f$ and @f$\kappa@f$.
       */
      explicit
      von_mises_distribution(result_type __mu = result_type(0),
			     result_type __kappa = result_type(1))
	: _M_param(__mu, __kappa)
      { }

      explicit
      von_mises_distribution(const param_type& __p)
      : _M_param(__p)
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      { }

      /**
       * @brief Returns the @f$ \mu @f$ of the distribution.
       */
      result_type
      mu() const
      { return _M_param.mu(); }

      /**
       * @brief Returns the @f$ \kappa @f$ of the distribution.
       */
      result_type
      kappa() const
      { return _M_param.kappa(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return _M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { _M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       */
      result_type
      min() const
      {
	return -__gnu_cxx::__math_constants<result_type>::__pi;
      }

      /**
       * @brief Returns the least upper bound value of the distribution.
       */
      result_type
      max() const
      {
	return __gnu_cxx::__math_constants<result_type>::__pi;
      }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng)
	{ return this->operator()(__urng, _M_param); }

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng,
		   const param_type& __p);

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ this->__generate(__f, __t, __urng, _M_param); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      template<typename _UniformRandomNumberGenerator>
	void
	__generate(result_type* __f, result_type* __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      /**
       * @brief Return true if two von Mises distributions have the same
       *        parameters and the sequences that would be generated
       *        are equal.
       */
      friend bool
      operator==(const von_mises_distribution& __d1,
		 const von_mises_distribution& __d2)
      { return __d1._M_param == __d2._M_param; }

      /**
       * @brief Inserts a %von_mises_distribution random number distribution
       * @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %von_mises_distribution random number distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>& __os,
		   const __gnu_cxx::von_mises_distribution<_RealType1>& __x);

      /**
       * @brief Extracts a %von_mises_distribution random number distribution
       * @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x  A %von_mises_distribution random number generator engine.
       *
       * @returns The input stream with @p __x extracted or in an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>& __is,
		   __gnu_cxx::von_mises_distribution<_RealType1>& __x);

    private:
      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;
    };

  /**
   * @brief Return true if two von Mises distributions are different.
   */
  template<typename _RealType>
    inline bool
    operator!=(const __gnu_cxx::von_mises_distribution<_RealType>& __d1,
	       const __gnu_cxx::von_mises_distribution<_RealType>& __d2)
    { return !(__d1 == __d2); }


  /**
   * @brief A discrete hypergeometric random number distribution.
   *
   * The hypergeometric distribution is a discrete probability distribution
   * that describes the probability of @p k successes in @p n draws @a without
   * replacement from a finite population of size @p N containing exactly @p K
   * successes.
   *
   * The formula for the hypergeometric probability density function is
   * @f[
   *   p(k|N,K,n) = \frac{\binom{K}{k} \binom{N-K}{n-k}}{\binom{N}{n}}
   * @f]
   * where @f$N@f$ is the total population of the distribution,
   * @f$K@f$ is the total population of the distribution.
   *
   * <table border=1 cellpadding=10 cellspacing=0>
   * <caption align=top>Distribution Statistics</caption>
   * <tr><td>Mean</td><td>@f$ n\frac{K}{N} @f$</td></tr>
   * <tr><td>Variance</td><td>@f$ n\frac{K}{N}\frac{N-K}{N}\frac{N-n}{N-1}
   *   @f$</td></tr>
   * <tr><td>Range</td><td>@f$[max(0, n+K-N), min(K, n)]@f$</td></tr>
   * </table>
   */
  template<typename _UIntType = unsigned int>
    class hypergeometric_distribution
    {
      static_assert(std::is_unsigned<_UIntType>::value, "template argument "
		    "substituting _UIntType not an unsigned integral type");

    public:
      /** The type of the range of the distribution. */
      typedef _UIntType  result_type;

      /** Parameter type. */
      struct param_type
      {
	typedef hypergeometric_distribution<_UIntType> distribution_type;
	friend class hypergeometric_distribution<_UIntType>;

	explicit
	param_type(result_type __N = 10, result_type __K = 5,
		   result_type __n = 1)
	: _M_N{__N}, _M_K{__K}, _M_n{__n}
	{
	  __glibcxx_assert(_M_N >= _M_K);
	  __glibcxx_assert(_M_N >= _M_n);
	}

	result_type
	total_size() const
	{ return _M_N; }

	result_type
	successful_size() const
	{ return _M_K; }

	result_type
	unsuccessful_size() const
	{ return _M_N - _M_K; }

	result_type
	total_draws() const
	{ return _M_n; }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return (__p1._M_N == __p2._M_N)
	      && (__p1._M_K == __p2._M_K)
	      && (__p1._M_n == __p2._M_n); }

      private:

	result_type _M_N;
	result_type _M_K;
	result_type _M_n;
      };

      // constructors and member function
      explicit
      hypergeometric_distribution(result_type __N = 10, result_type __K = 5,
				  result_type __n = 1)
      : _M_param{__N, __K, __n}
      { }

      explicit
      hypergeometric_distribution(const param_type& __p)
      : _M_param{__p}
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      { }

      /**
       * @brief Returns the distribution parameter @p N,
       *	the total number of items.
       */
      result_type
      total_size() const
      { return this->_M_param.total_size(); }

      /**
       * @brief Returns the distribution parameter @p K,
       *	the total number of successful items.
       */
      result_type
      successful_size() const
      { return this->_M_param.successful_size(); }

      /**
       * @brief Returns the total number of unsuccessful items @f$ N - K @f$.
       */
      result_type
      unsuccessful_size() const
      { return this->_M_param.unsuccessful_size(); }

      /**
       * @brief Returns the distribution parameter @p n,
       *	the total number of draws.
       */
      result_type
      total_draws() const
      { return this->_M_param.total_draws(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return this->_M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { this->_M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       */
      result_type
      min() const
      {
	using _IntType = typename std::make_signed<result_type>::type;
	return static_cast<result_type>(std::max(static_cast<_IntType>(0),
				static_cast<_IntType>(this->total_draws()
						- this->unsuccessful_size())));
      }

      /**
       * @brief Returns the least upper bound value of the distribution.
       */
      result_type
      max() const
      { return std::min(this->successful_size(), this->total_draws()); }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng)
	{ return this->operator()(__urng, this->_M_param); }

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng,
		   const param_type& __p);

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ this->__generate(__f, __t, __urng, this->_M_param); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      template<typename _UniformRandomNumberGenerator>
	void
	__generate(result_type* __f, result_type* __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

       /**
	* @brief Return true if two hypergeometric distributions have the same
	*        parameters and the sequences that would be generated
	*        are equal.
	*/
      friend bool
      operator==(const hypergeometric_distribution& __d1,
		 const hypergeometric_distribution& __d2)
      { return __d1._M_param == __d2._M_param; }

      /**
       * @brief Inserts a %hypergeometric_distribution random number
       * distribution @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %hypergeometric_distribution random number
       *             distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<typename _UIntType1, typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>& __os,
		   const __gnu_cxx::hypergeometric_distribution<_UIntType1>&
		   __x);

      /**
       * @brief Extracts a %hypergeometric_distribution random number
       * distribution @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x  A %hypergeometric_distribution random number generator
       *             distribution.
       *
       * @returns The input stream with @p __x extracted or in an error
       *          state.
       */
      template<typename _UIntType1, typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>& __is,
		   __gnu_cxx::hypergeometric_distribution<_UIntType1>& __x);

    private:

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;
    };

  /**
   * @brief Return true if two hypergeometric distributions are different.
   */
  template<typename _UIntType>
    inline bool
    operator!=(const __gnu_cxx::hypergeometric_distribution<_UIntType>& __d1,
	       const __gnu_cxx::hypergeometric_distribution<_UIntType>& __d2)
    { return !(__d1 == __d2); }

  /**
   * @brief A logistic continuous distribution for random numbers.
   *
   * The formula for the logistic probability density function is
   * @f[
   *     p(x|\a,\b) = \frac{e^{(x - a)/b}}{b[1 + e^{(x - a)/b}]^2}
   * @f]
   * where @f$b > 0@f$.
   *
   * The formula for the logistic probability function is
   * @f[
   *     cdf(x|\a,\b) = \frac{e^{(x - a)/b}}{1 + e^{(x - a)/b}}
   * @f]
   * where @f$b > 0@f$.
   *
   * <table border=1 cellpadding=10 cellspacing=0>
   * <caption align=top>Distribution Statistics</caption>
   * <tr><td>Mean</td><td>@f$a@f$</td></tr>
   * <tr><td>Variance</td><td>@f$b^2\pi^2/3@f$</td></tr>
   * <tr><td>Range</td><td>@f$[0, \infty)@f$</td></tr>
   * </table>
   */
  template<typename _RealType = double>
    class
    logistic_distribution
    {
      static_assert(std::is_floating_point<_RealType>::value,
		    "template argument not a floating point type");

    public:
      /** The type of the range of the distribution. */
      typedef _RealType result_type;
      /** Parameter type. */
      struct param_type
      {
	typedef logistic_distribution<result_type> distribution_type;

	param_type(result_type __a = result_type(0),
		   result_type __b = result_type(1))
	: _M_a(__a), _M_b(__b)
	{
	  __glibcxx_assert(_M_b > result_type(0));
	}

	result_type
	a() const
	{ return _M_a; }

	result_type
	b() const
	{ return _M_b; }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return __p1._M_a == __p2._M_a
	      && __p1._M_b == __p2._M_b; }

      private:
	void _M_initialize();

	result_type _M_a;
	result_type _M_b;
      };

      /**
       * @brief Constructors.
       */
      explicit
      logistic_distribution(result_type __a = result_type(0),
			    result_type __b = result_type(1))
      : _M_param(__a, __b)
      { }

      explicit
      logistic_distribution(const param_type& __p)
      : _M_param(__p)
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      { }

      /**
       * @brief Return the parameters of the distribution.
       */
      result_type
      a() const
      { return _M_param.a(); }

      result_type
      b() const
      { return _M_param.b(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return _M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { _M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       */
      result_type
      min() const
      { return -std::numeric_limits<result_type>::max(); }

      /**
       * @brief Returns the least upper bound value of the distribution.
       */
      result_type
      max() const
      { return std::numeric_limits<result_type>::max(); }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng)
	{ return this->operator()(__urng, this->_M_param); }

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator&,
		   const param_type&);

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ this->__generate(__f, __t, __urng, this->param()); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      template<typename _UniformRandomNumberGenerator>
	void
	__generate(result_type* __f, result_type* __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      /**
       * @brief Return true if two logistic distributions have
       *        the same parameters and the sequences that would
       *        be generated are equal.
       */
      template<typename _RealType1>
	friend bool
	operator==(const logistic_distribution<_RealType1>& __d1,
		   const logistic_distribution<_RealType1>& __d2)
	{ return __d1.param() == __d2.param(); }

      /**
       * @brief Inserts a %logistic_distribution random number distribution
       * @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %logistic_distribution random number distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>&,
		   const logistic_distribution<_RealType1>&);

      /**
       * @brief Extracts a %logistic_distribution random number distribution
       * @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x A %logistic_distribution random number
       *            generator engine.
       *
       * @returns The input stream with @p __x extracted or in an error state.
       */
      template<typename _RealType1, typename _CharT, typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>&,
		   logistic_distribution<_RealType1>&);

    private:
      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;
    };

  /**
   * @brief Return true if two logistic distributions are not equal.
   */
  template<typename _RealType1>
    inline bool
    operator!=(const logistic_distribution<_RealType1>& __d1,
	       const logistic_distribution<_RealType1>& __d2)
    { return !(__d1 == __d2); }


  /**
   * @brief A distribution for random coordinates on a unit sphere.
   *
   * The method used in the generation function is attributed by Donald Knuth
   * to G. W. Brown, Modern Mathematics for the Engineer (1956).
   */
  template<std::size_t _Dimen, typename _RealType = double>
    class uniform_on_sphere_distribution
    {
      static_assert(std::is_floating_point<_RealType>::value,
		    "template argument not a floating point type");
      static_assert(_Dimen != 0, "dimension is zero");

    public:
      /** The type of the range of the distribution. */
      typedef std::array<_RealType, _Dimen> result_type;
      /** Parameter type. */
      struct param_type
      {
	explicit
	param_type()
	{ }

	friend bool
	operator==(const param_type& __p1, const param_type& __p2)
	{ return true; }
      };

      /**
       * @brief Constructs a uniform on sphere distribution.
       */
      explicit
      uniform_on_sphere_distribution()
      : _M_param(), _M_nd()
      { }

      explicit
      uniform_on_sphere_distribution(const param_type& __p)
      : _M_param(__p), _M_nd()
      { }

      /**
       * @brief Resets the distribution state.
       */
      void
      reset()
      { _M_nd.reset(); }

      /**
       * @brief Returns the parameter set of the distribution.
       */
      param_type
      param() const
      { return _M_param; }

      /**
       * @brief Sets the parameter set of the distribution.
       * @param __param The new parameter set of the distribution.
       */
      void
      param(const param_type& __param)
      { _M_param = __param; }

      /**
       * @brief Returns the greatest lower bound value of the distribution.
       * This function makes no sense for this distribution.
       */
      result_type
      min() const
      {
	result_type __res;
	__res.fill(0);
	return __res;
      }

      /**
       * @brief Returns the least upper bound value of the distribution.
       * This function makes no sense for this distribution.
       */
      result_type
      max() const
      {
	result_type __res;
	__res.fill(0);
	return __res;
      }

      /**
       * @brief Generating functions.
       */
      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng)
	{ return this->operator()(__urng, _M_param); }

      template<typename _UniformRandomNumberGenerator>
	result_type
	operator()(_UniformRandomNumberGenerator& __urng,
		   const param_type& __p);

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng)
	{ this->__generate(__f, __t, __urng, this->param()); }

      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate(_ForwardIterator __f, _ForwardIterator __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      template<typename _UniformRandomNumberGenerator>
	void
	__generate(result_type* __f, result_type* __t,
		   _UniformRandomNumberGenerator& __urng,
		   const param_type& __p)
	{ this->__generate_impl(__f, __t, __urng, __p); }

      /**
       * @brief Return true if two uniform on sphere distributions have
       *        the same parameters and the sequences that would be
       *        generated are equal.
       */
      friend bool
      operator==(const uniform_on_sphere_distribution& __d1,
		 const uniform_on_sphere_distribution& __d2)
      { return __d1._M_nd == __d2._M_nd; }

      /**
       * @brief Inserts a %uniform_on_sphere_distribution random number
       *        distribution @p __x into the output stream @p __os.
       *
       * @param __os An output stream.
       * @param __x  A %uniform_on_sphere_distribution random number
       *             distribution.
       *
       * @returns The output stream with the state of @p __x inserted or in
       * an error state.
       */
      template<size_t _Dimen1, typename _RealType1, typename _CharT,
	       typename _Traits>
	friend std::basic_ostream<_CharT, _Traits>&
	operator<<(std::basic_ostream<_CharT, _Traits>& __os,
		   const __gnu_cxx::uniform_on_sphere_distribution<_Dimen1,
								   _RealType1>&
		   __x);

      /**
       * @brief Extracts a %uniform_on_sphere_distribution random number
       *        distribution
       * @p __x from the input stream @p __is.
       *
       * @param __is An input stream.
       * @param __x  A %uniform_on_sphere_distribution random number
       *             generator engine.
       *
       * @returns The input stream with @p __x extracted or in an error state.
       */
      template<std::size_t _Dimen1, typename _RealType1, typename _CharT,
	       typename _Traits>
	friend std::basic_istream<_CharT, _Traits>&
	operator>>(std::basic_istream<_CharT, _Traits>& __is,
		   __gnu_cxx::uniform_on_sphere_distribution<_Dimen1,
							     _RealType1>& __x);

    private:
      template<typename _ForwardIterator,
	       typename _UniformRandomNumberGenerator>
	void
	__generate_impl(_ForwardIterator __f, _ForwardIterator __t,
			_UniformRandomNumberGenerator& __urng,
			const param_type& __p);

      param_type _M_param;
      std::normal_distribution<_RealType> _M_nd;
    };

  /**
   * @brief Return true if two uniform on sphere distributions are different.
   */
  template<std::size_t _Dimen, typename _RealType>
    inline bool
    operator!=(const __gnu_cxx::uniform_on_sphere_distribution<_Dimen,
	       _RealType>& __d1,
	       const __gnu_cxx::uniform_on_sphere_distribution<_Dimen,
	       _RealType>& __d2)
    { return !(__d1 == __d2); }

_GLIBCXX_END_NAMESPACE_VERSION
} // namespace __gnu_cxx

#include "ext/opt_random.h"
#include "random.tcc"

#endif // _GLIBCXX_USE_C99_STDINT_TR1 && UINT32_C

#endif // C++11

#endif // _EXT_RANDOM
